Question

Part B
Kona wants to bake at most 30 loaves of banana bread and nut bread for a bake sale. Each loaf of banana bread sells for $2.50, and each loaf of nut bread sells for $2.75. Kona wants to make at least $44. The system of inequalities below models the situation. Graph the system of inequalities from Part A to determine in which quadrant(s) there are solutions that make sense for the situation.

Quadrant(s) =

Answer 1

Answer:

y = –5x

y = x+y= 4x

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Answer 2

Answer:

The required inequalities are: $x+y \leq 30$ and $2.5 x+2.75 y \geq 44$.

Step-by-step explanation:

Step 1: Consider the provided information.

Let x represents the number of banana bread and y represents the number of nut bread.

Kona wants to bake at most 30 loves of banana bread and nut bread for a bake sale.

Step 2: That means she want to make not more than 30 banana bread and nut bread for sale. This can be represented as:

$x+y \leq 30$

Step 3: Each loaf of banana bread sells for $\ 2.50$, And each loaf of nut bread sells for $\ 2.75$. Cora wants to make at least $\ 44$.

The required inequality is: $2.5 x+2.75 y \geq 44$

Hence, the required inequalities are: $x+y \leq 30$ and $2.5 x+2.75 y \geq 44$.

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